Image Encryption Technology Based on Fractional Two-Dimensional Triangle Function Combination Discrete Chaotic Map Coupled with Menezes-Vanstone Elliptic Curve Cryptosystem

A new fractional two-dimensional triangle function combination discrete chaotic map (2D-TFCDM) with the discrete fractional difference is proposed. We observe the bifurcation behaviors and draw the bifurcation diagrams, the largest Lyapunov exponent plot, and the phase portraits of the proposed map, respectively. On the application side, we apply the proposed discrete fractional map into image encryption with the secret keys ciphered by Menezes-Vanstone Elliptic Curve Cryptosystem (MVECC). Finally, the image encryption algorithm is analysed in four main aspects that indicate the proposed algorithm is better than others.

[1]  Dumitru Baleanu,et al.  Discrete chaos in fractional delayed logistic maps , 2015 .

[2]  Yong Zhou,et al.  Existence Results for Nonlinear Fractional Difference Equation , 2011 .

[3]  A. Peterson,et al.  Dynamic Equations on Time Scales , 2001 .

[4]  Yueping Li,et al.  A hyper-chaos-based image encryption algorithm using pixel-level permutation and bit-level permutation , 2017 .

[5]  Abdul Hanan Abdullah,et al.  Image encryption using a synchronous permutation-diffusion technique , 2017 .

[6]  Manuel Duarte Ortigueira,et al.  Introduction to fractional linear systems. Part 2. Discrete-time case , 2000 .

[7]  Lu Xu,et al.  A novel chaotic image encryption algorithm using block scrambling and dynamic index based diffusion , 2017 .

[8]  Lin Teng,et al.  A chaotic color image encryption using integrated bit-level permutation , 2017, Multimedia Tools and Applications.

[9]  Novel two dimensional discrete chaotic maps and simulations , 2012, 2012 IEEE 6th International Conference on Information and Automation for Sustainability.

[10]  Kwok-Wo Wong,et al.  Cryptanalyzing a chaos-based image encryption algorithm using alternate structure , 2011, J. Syst. Softw..

[11]  Zhihong Zhou,et al.  Image compression–encryption scheme based on hyper-chaotic system and 2D compressive sensing , 2016 .

[12]  Kalyani Mali,et al.  A Novel Lossless Image Encryption Method using DNA Substitution and Chaotic Logistic Map , 2016 .

[13]  Tiecheng Xia,et al.  Novel two dimensional fractional-order discrete chaotic map and its application to image encryption , 2018 .

[14]  Di Xiao,et al.  Analysis and improvement of a chaos-based image encryption algorithm , 2009 .

[15]  Wolfgang A. Halang,et al.  Cryptanalysis of an image encryption scheme based on a compound chaotic sequence , 2007, Image Vis. Comput..

[16]  Yushu Zhang,et al.  Breaking an image encryption algorithm based on hyper-chaotic system with only one round diffusion process , 2014, Nonlinear Dynamics.

[17]  P. Balasubramaniam,et al.  A novel cascade encryption algorithm for digital images based on anti-synchronized fractional order dynamical systems , 2017, Multimedia Tools and Applications.

[18]  D. Baleanu,et al.  Image encryption technique based on fractional chaotic time series , 2016 .

[19]  Michael T. Holm,et al.  The Laplace transform in discrete fractional calculus , 2011, Comput. Math. Appl..

[20]  Dumitru Baleanu,et al.  Jacobian matrix algorithm for Lyapunov exponents of the discrete fractional maps , 2015, Commun. Nonlinear Sci. Numer. Simul..

[21]  P. Eloe,et al.  A transform method in discrete fractional calculus , 2007 .

[22]  Di Xiao,et al.  Cryptanalyzing a novel image cipher based on mixed transformed logistic maps , 2013, Multimedia Tools and Applications.

[23]  Xiaoyan Wang,et al.  Image Encryption Algorithm Based on a Novel Improper Fractional-Order Attractor and a Wavelet Function Map , 2017, J. Electr. Comput. Eng..

[24]  Kiyomichi Araki,et al.  Overview of Elliptic Curve Cryptography , 1998, Public Key Cryptography.

[25]  Manuel Duarte Ortigueira,et al.  A new look into the discrete-time fractional calculus: derivatives and exponentials , 2013 .

[26]  Kwok-Wo Wong,et al.  Breaking a novel colour image encryption algorithm based on chaos , 2012, Nonlinear Dynamics.

[27]  N. Koblitz Elliptic curve cryptosystems , 1987 .

[28]  Safya Belghith,et al.  Cryptanalysis of a new substitution–diffusion based image cipher , 2010 .

[29]  Ahmed M. Soliman,et al.  Biomedical image encryption based on double-humped and fractional logistic maps , 2017, 2017 6th International Conference on Modern Circuits and Systems Technologies (MOCAST).

[30]  P. Eloe,et al.  Initial value problems in discrete fractional calculus , 2008 .

[31]  Di Xiao,et al.  Cryptanalysis of image scrambling based on chaotic sequences and Vigenère cipher , 2014 .

[32]  Tiecheng Xia,et al.  Fractional two-dimensional discrete chaotic map and its applications to the information security with elliptic-curve public key cryptography , 2018 .

[33]  F. Atici,et al.  Modeling with fractional difference equations , 2010 .

[34]  D. Baleanu,et al.  Discrete fractional logistic map and its chaos , 2014 .

[35]  Dumitru Baleanu,et al.  Discrete chaos in fractional sine and standard maps , 2014 .